What question did this study set out to answer?

The aim is to explore the higher integrability of gradients in weak solutions of p(x)-Laplacian equations with drift terms.

April 22, 2026

Higher integrability for p (x) -Laplacian equations with drift terms and non-logarithmic Zhikov's conditions

Key Points

The aim is to explore the higher integrability of gradients in weak solutions of p(x)-Laplacian equations with drift terms.
Development of two versions of generalized Gehring lemmas under specific conditions on the exponent p(x).
Establishment of a modified Sobolev-Poincaré inequality for variable exponent Sobolev norms.
Identification of sufficient conditions for drift terms to ensure solvability of the Dirichlet problem.
Introduction of optimized Zhikov's conditions that enhance the potential for higher integrability.
Generalization of existing results within the logarithmic Zhikov framework to broaden applicability.
Clarification of conditions under which the gradient of weak solutions gains higher integrability.

Abstract

In this paper, we study a higher integrability of gradient for the weak solutions of p (x) -Laplacian equations involving a drift term. We present two different versions of the generalized Gehring lemmas under some general conditions on the exponent p (x) and establish a modified version of the Sobolev-Poincaré inequality to deal with the Sobolev norms with variable exponents; these results optimize some known Zhikov's conditions for higher integrability. We also give some sufficient conditions on the drift term which will guarantee the solvability of the Dirichlet problem and the higher integrability of gradient for the weak solutions. Our results generalize the known results obtained within the logarithmic Zhikov framework.

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Higher integrability for p (x) -Laplacian equations with drift terms and non-logarithmic Zhikov's conditions

Key Points

Abstract

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